The Jones polynomial is an invariant of oriented links with
components.
When
,
the choice of orientation does not affect the polynomial, but for
,
changing orientations of some (but not all) components can change the polynomial.
Here we define a version of the Jones polynomial that is an invariant of
unoriented links; i.e., changing orientation of any sublink does not affect the
polynomial. This invariant shares some, but not all, of the properties of the Jones
polynomial.
The construction of this invariant also reveals new information about the
original Jones polynomial. Specifically, we show that the Jones polynomial of
a knot is never the product of a nontrivial monomial with another Jones
polynomial.
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